We describe the solutions of the linear equation aX + bY = cZ in the class of Dirichlet series with functional equation. Proofs are based on the properties of certain nonlinear twists of the L-functions
We prove the analytic continuation of certain linear twists of L-functions of degree 2 in the Selber...
We study the cancellation of zeros between the Riemann zeta function and certain Artin L-functions. ...
We prove a general result relating the shape of the Euler product of an L-function to the analytic p...
We investigate the analytic properties of nonlinear twists of $L$-functions. Given an $L$-function $...
This paper is concerned with a functional relationship between Dirichlet series with periodic coeffi...
AbstractWe will prove a uniqueness theorem for L-functions in terms of the pre-images of two values ...
AbstractWe prove a generalisation of the Converse Theorem of Maass for Dirichlet series with a finit...
We prove that every functional equation of Riemann's type has infinitely many linearly independent s...
This is a survey of recent work with J.Kaczorowski about non-linear twists of L-functions and their ...
We prove a generalisation of the Converse Theorem of Maass for Dirichlet series with a finite number...
We study a double Dirichlet series of the form $ \sum_d L(s,\chi_d \chi)\chi'(d)d^{-w} $, where $\ch...
The subject of this work is functional equations with direction towards linear functional equations....
We obtain the basic analytic properties, i.e. meromorphic continuation, polar structure and bounds f...
This thesis consists of three projects. The first project focuses on the distribution of zeros of l...
Let an, n ≥ 1, be complex numbers. If for a real number θ the summatory function n≤x an is O(x θ) as...
We prove the analytic continuation of certain linear twists of L-functions of degree 2 in the Selber...
We study the cancellation of zeros between the Riemann zeta function and certain Artin L-functions. ...
We prove a general result relating the shape of the Euler product of an L-function to the analytic p...
We investigate the analytic properties of nonlinear twists of $L$-functions. Given an $L$-function $...
This paper is concerned with a functional relationship between Dirichlet series with periodic coeffi...
AbstractWe will prove a uniqueness theorem for L-functions in terms of the pre-images of two values ...
AbstractWe prove a generalisation of the Converse Theorem of Maass for Dirichlet series with a finit...
We prove that every functional equation of Riemann's type has infinitely many linearly independent s...
This is a survey of recent work with J.Kaczorowski about non-linear twists of L-functions and their ...
We prove a generalisation of the Converse Theorem of Maass for Dirichlet series with a finite number...
We study a double Dirichlet series of the form $ \sum_d L(s,\chi_d \chi)\chi'(d)d^{-w} $, where $\ch...
The subject of this work is functional equations with direction towards linear functional equations....
We obtain the basic analytic properties, i.e. meromorphic continuation, polar structure and bounds f...
This thesis consists of three projects. The first project focuses on the distribution of zeros of l...
Let an, n ≥ 1, be complex numbers. If for a real number θ the summatory function n≤x an is O(x θ) as...
We prove the analytic continuation of certain linear twists of L-functions of degree 2 in the Selber...
We study the cancellation of zeros between the Riemann zeta function and certain Artin L-functions. ...
We prove a general result relating the shape of the Euler product of an L-function to the analytic p...